% Mizar ND problem: t3_xboole_1,xboole_1,37,24 fof(dh_c1_3__xboole_1,definition, ( ( r1_tarski(c1_3__xboole_1,k1_xboole_0) => c1_3__xboole_1 = k1_xboole_0 ) => ! [A] : ( r1_tarski(A,k1_xboole_0) => A = k1_xboole_0 ) ), introduced(definition,[new_symbol(c1_3__xboole_1),file(xboole_1,c1_3__xboole_1)]), [interesting(0.8),axiom,file(xboole_1,c1_3__xboole_1)]). fof(e1_3__xboole_1,assumption,( r1_tarski(c1_3__xboole_1,k1_xboole_0) ), introduced(assumption,[file(xboole_1,e1_3__xboole_1)]), [interesting(0.8),axiom,file(xboole_1,e1_3__xboole_1)]). fof(rc1_xboole_0,theorem,( ? [A] : v1_xboole_0(A) ), file(xboole_0,rc1_xboole_0), [interesting(0.9),axiom,file(xboole_0,rc1_xboole_0)]). fof(rc2_xboole_0,theorem,( ? [A] : ~ v1_xboole_0(A) ), file(xboole_0,rc2_xboole_0), [interesting(0.9),axiom,file(xboole_0,rc2_xboole_0)]). fof(reflexivity_r1_tarski,theorem,( ! [A,B] : r1_tarski(A,A) ), file(tarski,r1_tarski), [interesting(0.9),axiom,file(tarski,r1_tarski)]). fof(dt_k1_xboole_0,axiom,( $true ), file(xboole_0,k1_xboole_0), [interesting(0.9),axiom,file(xboole_0,k1_xboole_0)]). fof(dt_c1_3__xboole_1,assumption,( $true ), introduced(assumption,[file(xboole_1,c1_3__xboole_1)]), [interesting(0.8),axiom,file(xboole_1,c1_3__xboole_1)]). fof(fc1_xboole_0,theorem,( v1_xboole_0(k1_xboole_0) ), file(xboole_0,fc1_xboole_0), [interesting(0.9),axiom,file(xboole_0,fc1_xboole_0)]). fof(d10_xboole_0,definition,( ! [A,B] : ( A = B <=> ( r1_tarski(A,B) & r1_tarski(B,A) ) ) ), file(xboole_0,d10_xboole_0), [interesting(0.9),axiom,file(xboole_0,d10_xboole_0)]). fof(antisymmetry_r2_hidden,theorem,( ! [A,B] : ( r2_hidden(A,B) => ~ r2_hidden(B,A) ) ), file(hidden,r2_hidden), [interesting(0.9),axiom,file(hidden,r2_hidden)]). fof(t7_boole,theorem,( ! [A,B] : ~ ( r2_hidden(A,B) & v1_xboole_0(B) ) ), file(boole,t7_boole), [interesting(0.9),axiom,file(boole,t7_boole)]). fof(t8_boole,theorem,( ! [A,B] : ~ ( v1_xboole_0(A) & A != B & v1_xboole_0(B) ) ), file(boole,t8_boole), [interesting(0.9),axiom,file(boole,t8_boole)]). fof(t6_boole,theorem,( ! [A] : ( v1_xboole_0(A) => A = k1_xboole_0 ) ), file(boole,t6_boole), [interesting(0.9),axiom,file(boole,t6_boole)]). fof(t2_xboole_1,theorem,( ! [A] : r1_tarski(k1_xboole_0,A) ), file(xboole_1,t2_xboole_1), [interesting(0.9),axiom,file(xboole_1,t2_xboole_1)]). fof(e2_3__xboole_1,plain, ( r1_tarski(c1_3__xboole_1,k1_xboole_0) & r1_tarski(k1_xboole_0,c1_3__xboole_1) ), inference(mizar_by,[status(thm),assumptions([dt_c1_3__xboole_1,e1_3__xboole_1])],[antisymmetry_r2_hidden,rc1_xboole_0,rc2_xboole_0,t7_boole,t8_boole,reflexivity_r1_tarski,dt_k1_xboole_0,dt_c1_3__xboole_1,fc1_xboole_0,t6_boole,e1_3__xboole_1,t2_xboole_1]), [interesting(0.8),file(xboole_1,e2_3__xboole_1),[file(xboole_1,e2_3__xboole_1)]]). fof(i3_3__xboole_1,theorem,( $true ), introduced(tautology,[file(xboole_1,i3_3__xboole_1)]), [interesting(0.8),trivial,file(xboole_1,i3_3__xboole_1)]). fof(i2_3__xboole_1,plain,( c1_3__xboole_1 = k1_xboole_0 ), inference(conclusion,[status(thm),assumptions([dt_c1_3__xboole_1,e1_3__xboole_1])],[rc1_xboole_0,rc2_xboole_0,reflexivity_r1_tarski,dt_k1_xboole_0,dt_c1_3__xboole_1,fc1_xboole_0,d10_xboole_0,e2_3__xboole_1,i3_3__xboole_1]), [interesting(0.8),file(xboole_1,i2_3__xboole_1),[file(xboole_1,i2_3__xboole_1)]]). fof(i1_3__xboole_1,plain, ( r1_tarski(c1_3__xboole_1,k1_xboole_0) => c1_3__xboole_1 = k1_xboole_0 ), inference(discharge_asm,[status(thm),assumptions([dt_c1_3__xboole_1]),discharge_asm(discharge,[e1_3__xboole_1])],[e1_3__xboole_1,i2_3__xboole_1]), [interesting(0.8),file(xboole_1,i1_3__xboole_1),[file(xboole_1,i1_3__xboole_1)]]). fof(i1_3_tmp__xboole_1,plain, ( r1_tarski(c1_3__xboole_1,k1_xboole_0) => c1_3__xboole_1 = k1_xboole_0 ), inference(discharge_asm,[status(thm),assumptions([]),discharge_asm(discharge,[dt_c1_3__xboole_1])],[dt_c1_3__xboole_1,i1_3__xboole_1]), [interesting(1),t3_xboole_1]). fof(t3_xboole_1,theorem,( ! [A] : ( r1_tarski(A,k1_xboole_0) => A = k1_xboole_0 ) ), inference(let,[status(thm),assumptions([])],[i1_3_tmp__xboole_1,dh_c1_3__xboole_1]), [interesting(1),file(xboole_1,t3_xboole_1),[file(xboole_1,t3_xboole_1)]]).